AbstractThere is a long tradition in computer science of modelling finite data types such as stacks and natural numbers by algebras. More recently coalgebras, which are dual to algebras, have been used to model infinite data types and in operational semantics.In this report we consider categories of coalgebras from the perspective of topos theory. A mild generalisation of a well known theorem about toposes of coalgebras of a comonad is given. This result is used to prove that if B is a pullback preserving functor on a topos ∊, and if the forgetful functor UB : ∊B → ∊ has a right adjoint then ∊B, the category of B-coalgebras, is itself a topos.We also show that, if B is a bounded functor on Set preserving weak pullbacks, then the category Se...
AbstractWe analyse the category-theoretical structures involved with the notion of continuity within...
Let $Q$ be a finite quiver without oriented cycles. Denote by $\UB \ra \cwtM$ the fine moduli space ...
In the semantics of programming, finite data types such as finite lists, have traditionally been mod...
AbstractWe make an initial step towards a categorical semantics of guarded induction. While ordinary...
AbstractWe present two ways to define covarieties and complete covarieties, i.e. covarieties that ar...
AbstractMotivated by a model for syntactic control of interference, we introduce a general categoric...
AbstractThis paper presents a functional programming language, based on Moggi's monadic metalanguage...
AbstractThe Smyth completion ([15], [16], [18] and [19]) provides a topological foundation for Denot...
AbstractThis paper continues the study of the general theory, begun in [4], of semantic domains base...
AbstractFor every ultrametric space, the set of closed balls of radius 0 or 2-n for some n, form an ...
We present a general framework for termination proofs for Higher-Order Rewrite Systems. The method i...
This talk reviews results on the structure of algebras consisting of meromorphic differential operat...
AbstractBy proving the correspondence between the usual double-pushout approach and Banach's inward ...
AbstractWe give an abstract categorical presentation of continuation semantics by taking the continu...
In previous papers [HoEis], [Ho2000] we found neat Picard modular surfaces with abelian minimal mode...
AbstractWe analyse the category-theoretical structures involved with the notion of continuity within...
Let $Q$ be a finite quiver without oriented cycles. Denote by $\UB \ra \cwtM$ the fine moduli space ...
In the semantics of programming, finite data types such as finite lists, have traditionally been mod...
AbstractWe make an initial step towards a categorical semantics of guarded induction. While ordinary...
AbstractWe present two ways to define covarieties and complete covarieties, i.e. covarieties that ar...
AbstractMotivated by a model for syntactic control of interference, we introduce a general categoric...
AbstractThis paper presents a functional programming language, based on Moggi's monadic metalanguage...
AbstractThe Smyth completion ([15], [16], [18] and [19]) provides a topological foundation for Denot...
AbstractThis paper continues the study of the general theory, begun in [4], of semantic domains base...
AbstractFor every ultrametric space, the set of closed balls of radius 0 or 2-n for some n, form an ...
We present a general framework for termination proofs for Higher-Order Rewrite Systems. The method i...
This talk reviews results on the structure of algebras consisting of meromorphic differential operat...
AbstractBy proving the correspondence between the usual double-pushout approach and Banach's inward ...
AbstractWe give an abstract categorical presentation of continuation semantics by taking the continu...
In previous papers [HoEis], [Ho2000] we found neat Picard modular surfaces with abelian minimal mode...
AbstractWe analyse the category-theoretical structures involved with the notion of continuity within...
Let $Q$ be a finite quiver without oriented cycles. Denote by $\UB \ra \cwtM$ the fine moduli space ...
In the semantics of programming, finite data types such as finite lists, have traditionally been mod...